// Copyright (c) 2017-2026, Lawrence Livermore National Security, LLC and other CEED contributors. // All Rights Reserved. See the top-level LICENSE and NOTICE files for details. // // SPDX-License-Identifier: BSD-2-Clause // // This file is part of CEED: http://github.com/ceed /// @file /// libCEED QFunctions for diffusion operator example using PETSc #include #ifndef CEED_RUNNING_JIT_PASS #include #endif // ----------------------------------------------------------------------------- // This QFunction sets up the rhs and true solution for the problem // ----------------------------------------------------------------------------- CEED_QFUNCTION(SetupDiffRhs3)(void *ctx, CeedInt Q, const CeedScalar *const *in, CeedScalar *const *out) { #ifndef M_PI #define M_PI 3.14159265358979323846 #endif const CeedScalar *x = in[0], *w = in[1]; CeedScalar *true_soln = out[0], *rhs = out[1]; // Quadrature Point Loop CeedPragmaSIMD for (CeedInt i = 0; i < Q; i++) { const CeedScalar c[3] = {0, 1., 2.}; const CeedScalar k[3] = {1., 2., 3.}; // Component 1 true_soln[i + 0 * Q] = sin(M_PI * (c[0] + k[0] * x[i + Q * 0])) * sin(M_PI * (c[1] + k[1] * x[i + Q * 1])) * sin(M_PI * (c[2] + k[2] * x[i + Q * 2])); // Component 2 true_soln[i + 1 * Q] = 2 * true_soln[i + 0 * Q]; // Component 3 true_soln[i + 2 * Q] = 3 * true_soln[i + 0 * Q]; // Component 1 rhs[i + 0 * Q] = w[i + Q * 0] * M_PI * M_PI * (k[0] * k[0] + k[1] * k[1] + k[2] * k[2]) * true_soln[i + 0 * Q]; // Component 2 rhs[i + 1 * Q] = 2 * rhs[i + 0 * Q]; // Component 3 rhs[i + 2 * Q] = 3 * rhs[i + 0 * Q]; } // End of Quadrature Point Loop return 0; } // ----------------------------------------------------------------------------- // This QFunction applies the diffusion operator for a vector field of 3 components. // // Inputs: // ug - Input vector Jacobian at quadrature points // q_data - Geometric factors // // Output: // vJ - Output vector (test functions) Jacobian at quadrature points // ----------------------------------------------------------------------------- CEED_QFUNCTION(Diff3)(void *ctx, CeedInt Q, const CeedScalar *const *in, CeedScalar *const *out) { const CeedScalar *ug = in[0], *q_data = in[1]; CeedScalar *vg = out[0]; // Quadrature Point Loop CeedPragmaSIMD for (CeedInt i = 0; i < Q; i++) { // Read spatial derivatives of u components const CeedScalar uJ[3][3] = { {ug[i + (0 + 0 * 3) * Q], ug[i + (0 + 1 * 3) * Q], ug[i + (0 + 2 * 3) * Q]}, {ug[i + (1 + 0 * 3) * Q], ug[i + (1 + 1 * 3) * Q], ug[i + (1 + 2 * 3) * Q]}, {ug[i + (2 + 0 * 3) * Q], ug[i + (2 + 1 * 3) * Q], ug[i + (2 + 2 * 3) * Q]} }; // Read q_data (dXdxdXdx_T symmetric matrix) const CeedScalar dXdxdXdx_T[3][3] = { {q_data[i + 1 * Q], q_data[i + 2 * Q], q_data[i + 3 * Q]}, {q_data[i + 2 * Q], q_data[i + 4 * Q], q_data[i + 5 * Q]}, {q_data[i + 3 * Q], q_data[i + 5 * Q], q_data[i + 6 * Q]} }; for (int k = 0; k < 3; k++) { // k = component for (int j = 0; j < 3; j++) { // j = direction of vg vg[i + (k + j * 3) * Q] = (uJ[k][0] * dXdxdXdx_T[0][j] + uJ[k][1] * dXdxdXdx_T[1][j] + uJ[k][2] * dXdxdXdx_T[2][j]); } } } // End of Quadrature Point Loop return 0; } // -----------------------------------------------------------------------------